Due to the disturbances arising from the coherence of reflected waves and from echo noise,problems such as limitations,instability and poor accuracy exist with the current quantitative analysis methods.According to th...Due to the disturbances arising from the coherence of reflected waves and from echo noise,problems such as limitations,instability and poor accuracy exist with the current quantitative analysis methods.According to the intrinsic features of GPR signals and wavelet time–frequency analysis,an optimal wavelet basis named GPR3.3 wavelet is constructed via an improved biorthogonal wavelet construction method to quantitatively analyse the GPR signal.A new quantitative analysis method based on the biorthogonal wavelet(the QAGBW method)is proposed and applied in the analysis of analogue and measured signals.The results show that compared with the Bayesian frequency-domain blind deconvolution and with existing wavelet bases,the QAGBW method based on optimal wavelet can limit the disturbance from factors such as the coherence of reflected waves and echo noise,improve the quantitative analytical precision of the GPR signal,and match the minimum thickness for quantitative analysis with the vertical resolution of GPR detection.展开更多
For an expanding integer matrix M ∈ Mn(Z) and two finite digit sets D, S C Z^n with O∈ D ∩ S, we shall investigate and study the possible conditions on the spectral pair (μM,D,A(M, S)) associated with the it...For an expanding integer matrix M ∈ Mn(Z) and two finite digit sets D, S C Z^n with O∈ D ∩ S, we shall investigate and study the possible conditions on the spectral pair (μM,D,A(M, S)) associated with the iterated function systems {Фd(X) = M^-1(x + d)}d∈D and {φs(x) = M^*x + s}s∈S in the case when |D|= |S| = | det(M)|. Under the condition that (M^-1D, S) is a compatible pair, we obtain a series of necessary and sufficient conditions for (μM,D, A(M, S)) to be a spectral pair. These conditions include how to characterize the invariant sets A(M, S) and T(M, D) such that A(M, S) = Zn and μL(T(M, D)) = 1 which play an important role in the number system research and in the construction of Haar-type orthogonal wavelet basis respectively.展开更多
基金Projects(51678071,51278071)supported by the National Natural Science Foundation of ChinaProjects(14KC06,CX2015BS02)supported by Changsha University of Science&Technology,China
文摘Due to the disturbances arising from the coherence of reflected waves and from echo noise,problems such as limitations,instability and poor accuracy exist with the current quantitative analysis methods.According to the intrinsic features of GPR signals and wavelet time–frequency analysis,an optimal wavelet basis named GPR3.3 wavelet is constructed via an improved biorthogonal wavelet construction method to quantitatively analyse the GPR signal.A new quantitative analysis method based on the biorthogonal wavelet(the QAGBW method)is proposed and applied in the analysis of analogue and measured signals.The results show that compared with the Bayesian frequency-domain blind deconvolution and with existing wavelet bases,the QAGBW method based on optimal wavelet can limit the disturbance from factors such as the coherence of reflected waves and echo noise,improve the quantitative analytical precision of the GPR signal,and match the minimum thickness for quantitative analysis with the vertical resolution of GPR detection.
基金supported by the Key Project of Chinese Ministry of Education (Grant No. 108117)National Natural Science Foundation of China (Grant No. 10871123, 11171201)
文摘For an expanding integer matrix M ∈ Mn(Z) and two finite digit sets D, S C Z^n with O∈ D ∩ S, we shall investigate and study the possible conditions on the spectral pair (μM,D,A(M, S)) associated with the iterated function systems {Фd(X) = M^-1(x + d)}d∈D and {φs(x) = M^*x + s}s∈S in the case when |D|= |S| = | det(M)|. Under the condition that (M^-1D, S) is a compatible pair, we obtain a series of necessary and sufficient conditions for (μM,D, A(M, S)) to be a spectral pair. These conditions include how to characterize the invariant sets A(M, S) and T(M, D) such that A(M, S) = Zn and μL(T(M, D)) = 1 which play an important role in the number system research and in the construction of Haar-type orthogonal wavelet basis respectively.
